Abstract
We refer to Krupka's variational sequence, i.e. the quotient of the de Rham sequence on a finite order jet space with respect to a ‘variationally trivial’ subsequence. Among the morphisms of the variational sequence there are the Euler-Lagrange operator and the Helmholtz operator.
In this note we show that the Lie derivative operator passes to the quotient in the variational sequence. Then we define the variational Lie derivative as an operator on the sheaves of the variational sequence. Explicit representations of this operator give us some abstract versions of Noether's theorems, which can be interpreted in terms of conserved currents for Lagrangians and Euler-Lagrange morphisms.
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References
I. M. Anderson and T. Duchamp: On the existence of global variational principles. Amer. Math. J. 102 (1980), 781–868.
L. Fatibene, M. Francaviglia and M. Palese: Conservation laws and variational sequences in gauge-natural theories. Math. Proc. Cambridge Phil. Soc. 130 (2001), 555–569.
M. Ferraris: Fibered connections and global Poincaré-Cartan forms in higher-order calculus of variations. Proc. Diff. Geom. and its Appl. (Nové Město na Moravě, 1983) (D. Krupka, ed.). J. E. Purkyně University, Brno, 1984, pp. 61–91.
M. Ferraris and M. Francaviglia: The Lagrangian approach to conserved quantities in general relativity. Mechanics, Analysis and Geometry: 200 Years after Lagrange (M. Francaviglia, ed.). Elsevier Science Publishers B. V., Amsterdam, 1991, pp. 451–488.
M. Francaviglia, M. Palese and R. Vitolo: Superpotentials in variational sequences. Proc. VII Conf. Diff. Geom. and Appl., Satellite Conf. of ICM in Berlin (Brno 1998) (I. Kolář et al., eds.). Masaryk University, Brno, 1999, pp. 469–480.
P. L. Garcia and J. Muñoz: On the geometrical structure of higher order variational calculus. Proc. IUTAM-ISIMMSymp. on Modern Developments in Anal. Mech. (Torino, 1982) (S. Benenti, M. Francaviglia and A. Lichnerowicz, eds.). Tecnoprint, Bologna, 1983, pp. 127–147.
I. Kolář, P. W. Michor and J. Slovák: Natural Operations in Differential Geometry. Springer-Verlag, New York, 1993.
I. Kolář: Lie derivatives and higher order Lagrangians. Proc. Diff. Geom. and its Appl. (Nové Město na Moravě, 1980) (O. Kowalski, ed.). Univerzita Karlova, Praha, 1981, pp. 117–123.
I. Kolář: A geometrical version of the higher order hamilton formalism in fibred manifolds. J. Geom. Phys. 1 (1984), 127–137.
D. Krupka: Some geometric aspects of variational problems in fibred manifolds. Folia Fac. Sci. Nat. UJEP Brunensis 14, J. E. Purkyně Univ., Brno (1973), 1–65.
D. Krupka: Variational sequences on finite order jet spaces. Proc. Diff. Geom. and its Appl. (Brno, Czech Republic, 1989) (J. Janyška, D. Krupka, eds.). World Scientific, Singapore, 1990, pp. 236–254.
D. Krupka: Topics in the calculus of variations: Finite order variational sequences. Proc. Diff. Geom. and its Appl. Opava, 1993, pp. 473-495.
D. Krupka and A. Trautman: General invariance of Lagrangian structures. Bull. Acad. Polon. Sci., Math. Astr. Phys. 22 (1974), 207–211.
L. Mangiarotti and M. Modugno: Fibered spaces, jet spaces and connections for field theories. Proc. Int. Meet. on Geom. and Phys.. Pitagora Editrice, Bologna, 1983, pp. 135���165.
J. Novotný: Modern methods of differential geometry and the conservation laws problem;. Folia Fac. Sci. Nat. UJEP Brunensis (Physica) 19 (1974), 1–55.
D. J. Saunders: The Geometry of Jet Bundles. Cambridge Univ. Press, Cambridge, 1989.
F. Takens: A global version of the inverse problem of the calculus of variations. J. Diff. Geom. 14 (1979), 543–562.
A. Trautman: Noether equations and conservation laws. Comm. Math. Phys. 6 (1967), 248–261.
A. Trautman: A metaphysical remark on variational principles. Acta Phys. Pol. B 27 (1996), 839–848.
W. M. Tulczyjew: The Lagrange complex. Bull. Soc. Math. France 105 (1977), 419–431.
A. M. Vinogradov: On the algebro-geometric foundations of Lagrangian field theory. Soviet Math. Dokl. 18 (1977), 1200–1204.
A. M. Vinogradov: A spectral sequence associated with a non-linear differential equation, and algebro-geometric foundations of Lagrangian field theory with constraints. Soviet Math. Dokl. 19 (1978), 144–148.
R. Vitolo: On different geometric formulations of Lagrangian formalism. Diff. Geom. and its Appl. 10 (1999), 225–255.
R. Vitolo: Finite order Lagrangian bicomplexes. Math. Proc. Cambridge Phil. Soc. 125 (1998), 321–333.
R. Vitolo: A new infinite order formulation of variational sequences. Arch. Math. Univ. Brunensis 34 (1998), 483–504.
R. O. Wells: Differential Analysis on Complex Manifolds (GTM, n. 65). Springer-Verlag, Berlin, 1980.
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Francaviglia, M., Palese, M. & Vitolo, R. Symmetries in finite order variational sequences. Czechoslovak Mathematical Journal 52, 197–213 (2002). https://doi.org/10.1023/A:1021735824163
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DOI: https://doi.org/10.1023/A:1021735824163